ON A PERIODIC PART OF PSEUDO-BCI-ALGEBRAS

Apply

ON A PERIODIC PART OF PSEUDO-BCI-ALGEBRAS

Journal Title: Discussiones Mathematicae - General Algebra and Applications - Year 2015, Vol 35, Issue 2

Abstract

In the paper the connections between the set of some maximal elements of a pseudo-BCI-algebra and deductive systems are established. Using these facts, a periodic part of a pseudo-BCI-algebra is studied.

Authors and Affiliations

Grzegorz Dymek

Keywords

AN EQUATIONAL AXIOMATIZATION OF POST ALMOST DISTRIBUTIVE LATTICES

In this paper, we prove that the class of P2-Almost Distributive Lattices and Post Almost Distributive Lattices are equationally definable.

Relative determinant of a bilinear module

The aim of the paper is to generalize the (ultra-classical) notion of the determinant of a bilinear form to the class of bilinear forms on projective modules without assuming that the determinant bundle of the module is...

APPLICATIONS OF SADDLE-POINT DETERMINANTS

For a given square matrix A ∈ Mn(R) and the vector e ∈ (R)^n of ones denote by (A, e) the matrix A e e^T 0 This is often called the saddle point matrix and it plays a significant role in several branches of m...

Bi-Interior Ideals of Semigroups

In this paper, as a further generalization of ideals, we introduce the notion of bi-interior ideal as a generalization of quasi ideal, bi-ideal and interior ideal of semigroup and study the properties of bi-interior idea...

Generalized Derivations With Left Annihilator Conditions in Prime and Semiprime Rings

Let R be a prime ring with its Utumi ring of quotients U, C = Z(U) be the extended centroid of R, H and G two generalized derivations of R, L a noncentral Lie ideal of R, I a nonzero ideal of R. The left annihilator of S...

EP ID EP304479
DOI -
Views 25
Downloads 0